Category:Superfunctions
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This category contains results about Superfunctions.
Let $C, D \subseteq \C$ with $z \in C \implies z + 1 \in C$.
Let $F: C \to D$ and $H: D \to D$ be holomorphic functions.
Let $\map H {\map F z} = \map F {z + 1}$ for all $z \in C$.
Then $F$ is said to be a superfunction of $H$, and $H$ is called a transfer function of $F$.
Pages in category "Superfunctions"
The following 2 pages are in this category, out of 2 total.